Friday 2/28
You MUST ride the bus to and from the math fair.
1) Come to school in your formal clothes, and bring some money to buy food at Hofstra (you can also bring lunch
instead).
2) Drop off your project board in the math office upstairs before 1st period.
3) At the start of 9th period, pick up your project board and report to the front entrance of the school (the one by the bus
circle).
4) The school bus will leave RHS for Hofstra at 2:15pm.
5) The bus will drop us off at the student center (top center of the map).
6) At 3:00, we will cross over the unispan walkway, and head to our individual classrooms.
7) The judging will begin in your room at 3:30. When your room is finished, report directly back to the student center.
8) If your parents wish to attend, they can meet you in your assigned room, or they can meet you at the student center.
9) The school bus will take us back to RHS with an ETA of 7:15pm. (It depends on how long it takes for the other judges
and schools to finish up.)
Building Key
A
Adams
23
BR
Breslin
37
BRW
CHP
Berliner Hall
59
D
Davison
28
GAL
HA
Hauser
25
HGN
MA
Mason
44
ME
Roosevelt
34
S
R
Hagedorn Hall 63
Memorial
C.V. Starr
26
62
Brower
41
44
Gallon Wing
L
Emily Lowe
24
N
Netherlands
11
SC
Student Cntr
13
Roslyn HS
Adib
Arwa
9
The Hands On The Clock Go Round And Round
D015
Allen
Landon
9
The Shrinking Chain
D016
Anand
Shawn
9
The Infinite Spiral
D017
Antenberg
Jeremy
9
The Spiral Path
D020
Batnick
Matthew
9
Squares and Hexagons: Made in the Shade
D101
Ben-Levi
Alison
9
The Center of the Satellites
D102
Berger
Harrison
9
The Area of a Pool Rack
D104
Bochner
Steven
9
Packman Rules
GAL013
Chavez
Evelyn
9
Shrinking Crosshairs
GAL014
Dusling
Briana
9
The Kaleidoscope Effect
GAL016
Dusling
Keith
9
Finding the Area & Circumference of inscribed circles
GAL017
Faber
Benjamin
9
The Condensing Crowns
GAL018
Ghiam
Kamyar
9
The sky is the limit
GAL242
Ginsberg
Rachel
9
Triangles, Circles, and Infinity
HA109
Gomez
Ryan
9
The Sun Wheel
L201
Gupta
Anuj
9
tetragonal fractals
L203
Haber
Ethan
9
The Octagon-Square Investigation
L211
Hendler
Jonah
9
Hexception
ME010B
Hon
Kellie
9
Investigations with Polygonal Numbers
D011
Hong
Hannah
9
The Staircase in the Triangle
D014
Jung
Yoosol
9
Exploration of a Diagonal Array of Circles within Square
D015
Kashani
Mark
9
Circles, circles, and more circles inside of an isosceles
D016
Kim
Eunice
9
The infinite ramp
D020
Kim
Yena
9
The Shrinking Packman
D017
Kirsh
Evan
9
The Circular Showflake Effect
D101
Kuperman
Joshua
9
The Triforce of Circles
D102
Last Name
First Name
Grade Team
Topic
Room
Lee
William
9
The Mystery of an Inscribed Hexagon
D104
Lempert
Justin
9
A Study of Half-gons
GAL013
Littman
Corey
9
An Exploration of Ring Polygons
GAL014
Litvack
Matthew
9
Polygons Formed Using Tangent Circles
GAL016
Londin
Joshua
9
The Hex
GAL017
Markbreiter
Spencer
9
Quadrilaterals Inscribed in Squares and Polygons
GAL018
Mines
Zach
9
The Disappearing Wave
GAL242
Om
Christine
9
Circumference = 2R(pi)^2???
HA109
Resnick
David
9
An Original Tiling
L201
Richter
Joshua
9
Infinite Perimeter… Finite Area
L203
Roitgarts
Michelle
9
Analysis of the Cube-Model Pyramid
L211
Rudra
Ritwik
9
The Unexpected Angle…
ME010B
Rust
Alyssa
9
The Case of the Missing Diagonal
D011
Ruttgeizer
Marisa
9
The Infinite Tetrahedron
D014
Simon
Ryan
9
Koch Snowflake… from Scratch
D015
Smith
Isabella
9
The Stack of Shrinking Circles
D020
Son
Jimin
9
Generating Polygon Designs using Geometric
D016
Sterneck
Rachel
9
A Twist on the Classic Porosity Problem
D017
Warshawsky
Todd
9
Circles Inscribed within Triangles
D101
Zodicoff
Jessica
9
Spheres of Life
D104
Yu
Bowen
10
Imaginary numbers and eulers formula
S108
Roslyn MS
Bloom
Josh
7
Hardy-Weinberg principle
BRW202
Kann
Johanna
7
Nash Equilibrium
BR206
Ke
Adrian
7
Four Color Theorem
BR209
Landesberg
Melanie
7
Golden Ratio/Stcok Market
BRW101
Lee
Priscilla
7
Life Without Pi
BRW102
Liu
Alex
7
Prime Numbers
BRW103
Om
Justin
7
Koch Snowflake
BRW104
Russ
Mark
7
Conic Sections
BRW201
Schneider
Gemma
7
Nim
BRW106
Baik
Paul
8
Polygons and Number Theory
BR020
Benatar
Robbie
8
Probability / Game Theory
BR025
Bernstein
Jordan
8
Number Theory
BR026
Chen
Ryan
8
Number Theory - counting
BR100
DiSanti
Nicholas
8
Number Theory
BR103
Eisenberg
Ellie
8
Number Theory
BR105
Fox
Sawyer
8
Number Theory - Sums of Digits
BR106
Galante
Jasmine
8
Geometry - Area of Shaded regions
BR112
Golub
Henry
8
Geometry - Area of Shaded regions
BR202
Hurwitz
Ryan
8
Geometry - Area
BR208
Khazzam
Zachary
8
Number Theory - Squares in NxN grids
BR111
Kim
Noah
8
Geometry - Area
BR216
Kozuch
Cameyn
8
Geometry - Law of Cosines Application
BR217
Leu
Eric ( Justin)
8
Polygons
BR203
Robbins
Adam
8
Circle Packing in Regular Polygons
BR015
Rubin
Sophie
8
Volume and Number Theory
BR016
Sun
Maxwell
8
Geometry: Area / Special Right Triangles
BR020
Tom
Stephanie
8
Combinations
BR025
Tran
Angela
8
Probability / Game Theory
BR026
Wu
Jason
8
Number Theory - Triangle of Numbers
BR112
Ahmed
Arya
8
Cantor Set
BR100
Cesarski
Shannon
8
Prisoners Dilemma
BR103
Dicker
Anna
8
Conic Sections
BR105
Drenis
Tommy
8
Benford's Law
BR106
Hazel
Alex
8
Benford's Law
BR111
Latto
Sarah
8
Monty Hall Problem
BR202
Lazar
Spencer
8
Bayes Theorem
BR203
Lee
Austin
8
Game Theory & Economics
BR208
Michaels
Sophie
8
Crime Investigation
BR216
Miller
Jennie
8
Chaos Theory/Fractals
BR217
Pion
Jillian
8
Birthday Problem
BR015
Rosman
Ben
8
Monty Hall Problem
BR016
Winston
Daniel
8
Latin Squares
BR020